Integration of odd power of cotangent multiplied by odd power of cosecant

Describe the strategy you would use to (integrate:
cot^m x)(csc^n x)dx, if m and n are odd.

2. Relevant equations

I know the integral of cosecant is ln |sec x + tan x| + C

I also know the integral of cotangent is ln |sinx| + C

But I have no clue how this would apply to odd powers and multiplying them together.

3. The attempt at a solution

I know how to multiply odd powers of sine and cosine, but for cosecant and cotangent, I have no clue where to get started. The question isn't asking me to actually integrate, but just to describe how I would integrate. Does this integration parallel the corresponding rules for odd powers and multiplication of tanx and secx? Help, please.

Doesn't your book describe how to do this? thing of an identity that relates the two trig functions, also your not worried about the integral of them individually in this case you want to think about their deviates so you can use substitution....

Hey,
No my book only mentions how to solve this for two even-powered; and one odd and one even. It doesn't even give any hints about how to integrate when there are two odd-powered cosecant and cotangent functions being multiplied.